Further characterizations of $m$-weak group inverses in a proper $\ast$-ring

Year 2025, Volume: 54 Issue: 6 , 2295 - 2305 , 30.12.2025

Yukun Zhou , Jianlong Chen

https://doi.org/10.15672/hujms.1592462

Cited By: 1

https://izlik.org/JA24BD73CN

Abstract

Let $R$ be a proper $\ast$-ring, $a,b\in R$ and $m\in \mathbb{N}$. It is proved that $a$ is $m$-weak group invertible if and only if $a$ is right hybrid $(a^k,(a^k)^*a^m)$-invertible for some $k\in \mathbb{N}^+$. Several new characterizations of $m$-weak group inverses are presented by means of right ideal and right annihilator. Under the assumption that $a$ has the $m$-weak group inverse $a^{w_m}$, we present some sufficient and necessary conditions which guarantee the additive property to hold for $m$-weak group inverses, namely $(a+b)^{w_m}=(1+a^{w_m}b)^{-1}a^{w_m}$.

Keywords

m-weak group inverse , weak group inverse , hybrid (b , c)-inverse , pseudo core inverse

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